This myriad of numbers hides 7 pathways that each link a sequence of numbers.

aaa

1

2

3

4

5

6

7

8

9

10

11

12

13

a

55

92

34

28

225

55

12

256

45

89

70

361

144

b

55

169

47

89

196

233

53

225

66

144

256

233

289

c

34

67

21

61

66

16

8

45

35

53

51

225

47

d

53

276

13

59

21

253

15

13

231

169

28

196

2

e

324

256

35

361

225

89

22

256

13

289

253

324

233

f

128

22

35

64

71

32

253

28

210

15

64

351

325

g

210

16

35

15

21

22

231

92

55

35

70

92

43

h

47

12

43

2

2

4

4

45

4

28

45

51

70

i

324

289

8

92

253

12

59

324

22

8

231

35

4

j

61

59

16

61

67

233

71

153

120

22

210

117

12

k

289

53

47

128

256

300

53

276

21

253

34

276

300

l

351

8

325

91

4

300

8

66

91

233

66

276

325

m

361

59

51

70

61

64

59

210

35

231

61

253

67

Each sequence is exactly a consecutive series of 7 numerals in length. The numerals are connected orthogonally, and usually in a perpendicular direction. The path connecting numerals within a sequence may not be intersected or crossed by itself or any other path, and numerals are unique to a particular sequence.

The sequences are:
Prime, Triangle, Square, Pentagonal, Hexagonal, Fibonnacci and Powers of 2, and obviously, do not expect every sequence to begin with its first term.

Hints:
1. Use your "prt sc" function to make a print-out of the page.
2. Determine the range of each sequence within the numeric range of the table.
3. Be aware that some full length sequences exist but would impinge on others.

Note: the three numbers bold and underlined are not part of a solution sequence but demonstrate how a Power of 2 trail might begin.